Strategy- Use the Pythagorean theorem to determine the distance the light pulse moves in
one tick as measured by Katherine. - Use the fact that distance equals the product of speed and time to replace the
distances in the diagram. - Simplify the equation.
Mathematics principle
We will use the Pythagorean theoremStep-by-step derivation
In Katherine’s reference frame, the light traces out the hypotenuses of two right
triangles. We use the Pythagorean theorem to calculate the hypotenuse. The triangle’s
height is calculated using the speed of light and the time measured by the professor. Its
base is calculated using Katherine’s measurement of the clock’s speed.We have one last distance left, and again we substitute for it using the speed equation. Then a series of algebraic steps yield the equation for
time dilation.Equation for time dilation
t = “stationary” observer time
t 0 = proper time in “moving” frame
v = speed of reference frame
c = speed of light
Step Reason
1. Pythagorean theorem
2. light travels two hypotenuses
3.^2 h = ct 0 definition of speed
4. 2 L = vt definition of speed
5. substitute equations 3 and 4 into
equation 2
Step Reason
6. 2 s = ct definition of speed
7. substitute equation 6 into equation 5; square both sides
8. expand and re-arrange
9. divide both sides by c^2 – v^2 ; simplify
10. take square root
(^646) Copyright 2007 Kinetic Books Co. Chapter 35